On path decompositions of 2k-regular graphs
Abstract
Tibor Gallai conjectured that the edge set of every connected graph G on n vertices can be partitioned into n/2 paths. Let Gk be the class of all 2k-regular graphs of girth at least 2k-2 that admit a pair of disjoint perfect matchings. In this work, we show that Gallai's conjecture holds in Gk, for every k ≥ 3. Further, we prove that for every graph G in Gk on n vertices, there exists a partition of its edge set into n/2 paths of lengths in \2k-1,2k,2k+1\.
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